Korselt Rational Bases of Prime Powers

Abstract

Let N be a positive integer, A be a subset of Q and α=α1α2∈ A \0,N\. N is called an α-Korselt number (equivalently α is said an N-Korselt base) if α2p-α1 divides α2N-α1 for every prime divisor p of N. By the Korselt set of N over A, we mean the set A-KS(N) of all α∈ A \0,N\ such that N is an α-Korselt number. In this paper we determine explicitly for a given prime number q and an integer l∈ N \0,1\, the set Q-KS(ql) and we establish some connections between the ql-Korselt bases in Q and others in Z. The case of A=Q[-1,1[ is studied where we prove that (Q[-1,1[)-KS(ql) is empty if and only if l=2. Moreover, we show that each nonzero rational α is an N-Korselt base for infinitely many numbers N=ql where q is a prime number and l∈N.